2. If ABCD is a parallelogram, which of the following statements must be true? (1 point)

∠A≅∠B and ∠C≅∠D
AB = BC = CD = AD
AC = BD
AB = CD and BC = AD

3. Which statement is true? (1 point)

All rectangles are quadrilaterals
All quadrilaterals are rectangles.
All quadrilaterals are parallelograms.
All quadrilaterals are squares.

4. Fill in the blank with always, sometimes, or never. If there is not enough information, choose inconclusive.

A parallelogram is ___________________ a rectangle. (1 point)

Always
Sometimes
Never
Inconclusive

5. A stop sign is in the shape of a regular octagon. What is the measure of each exterior angle? (1 point)

40°
45°
50°
55°

6. For the parallelogram, find coordinates for P without using any new variables. (1 point)
(a – c, c)
(c, a)
(a + c, b)
(c, b)

7. The measures of two complementary angles are in the ratio 1:9. What are the degree measures of the two angles? (1 point)

10° and 80°
9° and 81°
20° and 160°
18° and 162°

8. What is the solution of the proportion?

3/4=m/32

(1 point)

24
8
3/8
1/24

9. Find the value of x. The polygons are similar, but not necessarily drawn to scale. (1 point)
14
21
96
504

10. In a diagram of a landscape plan, the scale is 1 cm = 10 ft. In the diagram, the flowers are 3.9 cm apart. How far apart should the actual flowers be planted? (1 point)
0.39 ft
39 cm
39 ft
390 ft.

11. Determine whether the triangles are similar. If so, what is the similarity statement and the postulate or theorem used? (1 point)
ΔTRS ~ ΔTPQ; SSS ~
ΔTRS ~ ΔTPQ; SAS ~
ΔTRS ~ ΔPQR; SAS ~
The triangles are not similar

12. Which theorem or postulate proves the two triangles are similar? The figure is not drawn to scale. (1 point)
AA Postulate
AS Postulate
SAS Theorem
SSS Theorem

13. What is the geometric mean of the pair of numbers?
99 and 11
(1 point)
968
33
43
38

14. Kathy lives directly east of the park. The football field is directly south of the park. The library sits on the line formed between Kathy’s home and the football field at the exact point where an altitude to the right triangle formed by her home, the park, and the football field could be drawn. The library is 9 miles from her home. The football field is 12 miles from the library.

a. How far is the library from the park?
b. How far is the park from the football field?
(1 point)

6√3 miles; 6√7
6√7 miles; 6√3 miles
√33 miles, √21 miles
√21 miles, √33 miles

15. What is the value of x, given that OP || NQ? (1 point)
x = 10
x = 20
x = 13
x = 25.5

16. ABC has side lengths 8, 15, and 17. Do the side lengths form a Pythagorean triple? (1 point)

yes
no

17. A triangle has side lengths of 18 cm, 80 cm, and 81 cm. Is the triangle acute, obtuse, or right? (1 point)
Right
Acute
obtuse

18. In ΔABC, ∡A is a right angle, and m∡B = 45°. What is the length of BC? If the answer is not an integer, leave it in simplest radical form. The diagram is not drawn to scale.
(1 point)
11 ft
11√2 ft
11√3 ft
22 ft

19. The length of the hypotenuse of a 30°-60°-90° triangle is 7. Find the perimeter. (1 point)
7/2 + 21/2√3
21+7√3
7+21√3
21/2 + 7/2√3

20. What is the missing value to the nearest hundredth?
tan = 7 (1 point)
54.94°
56.94°
81.87°
85.94°

21. What are the ratios for sin A and cos A? The diagram is not drawn to scale. (1 point)
sin A= 20/29, cos A= 21/29
sin A= 21/29, cos A= 20/21
sin A= 21/29, cos A= 20/29
sin A= 21/20, cos A = 20/21

22. To approach the runway, a pilot of a small plane must begin a 20° descent starting from a height of 3,760 feet above the ground. To the nearest tenth of a mile, how many miles from the runway is the airplane at the start of this approach? The figure is not drawn to scale. (1 point)

10,993.5 mi
2.1 mi
1.8 mi
0.8 mi

f23. What is the area of the figure? The diagram is not drawn to scale. (1 point)
114 in^2
57 in^2
812 in^2
957 in^2

24. An isosceles triangle has an area of 125 ft. If the base is 14 ft, what is the length of each leg? Round the answer to the nearest tenth. (1 point)
19.2 ft
17.9 ft
36.4 ft
22.7 ft

25. Find the area of the trapezoid. Leave your answer in the simplest radical form. The figure is not drawn to scale. (1 point)
84 cm²
96 cm²
72 cm²
108 cm²

26. A kite has diagonals 10.2 ft and 8 ft. What is the area of the kite? (1 point)
72.8 ft²
17.6 ft²
40.8 ft²
81.6 ft²

27. What is the area of a regular pentagon with an apothem 14 inches long and a side 20 inches long? Round the answer to the nearest inch. (1 point)
1,400 in²
700 in²
175 in²
140 in²

28. Hank raises mealworms. In a square of compost 5 ft by 5 ft, he can have 2,000 mealworms. How many mealworms can he have if his square of compost has a side length that is six times longer? (1 point)
12,000
60,000
72,000
300,000

29. What is the circumference of the circle in terms of π? (1 point)
900π in
90π in
60π in
30π in

30. What is the length of XPY in terms of π? (1 point)
30π m
10π m
300π m
100π m

31. What is the area of the circle in terms of π? (1 point)
3.4225π m²
6.845π m²
7.4π m²
13.69π m²

32. What is the area of the figure to the nearest tenth? (1 point)
6.0 in²
12.0 in²
24.0 in²
26.3 in²

33. Use formulas to find the lateral area and surface area of the given prism. Round your answer to the nearest whole number. The figure is not drawn to scale. (1 point)
472 m² ; 486 m²
443 m² ; 486 m²
472 m² ; 479 m²
443 m² ; 500 m²

34. Use Euler’s Formula to find the missing number.
Edges: 37
Faces: 25
Vertices: ?

(1 point)
13
14
15
17

35. What is the surface area of the cylinder in terms of pi? The diagram is not drawn to scale. (1 point)
210π in²
308π in²
224π in²
98π in²

36. What is the surface area of the pyramid shown to the nearest whole number? The diagram is not drawn to scale. (1 point)
56 ft²
72 ft²
22 ft²
128 ft²

37. What is the surface area of a conical grain storage tank that has a height of 54 meters and a diameter of 18 meters? Round the answer to the nearest square meter. (1 point) 1,802 m²
1,781 m²
3,110 m²
1,548 m²

38. Cylinder A has a radius of 1 m and a height of 4 m. Cylinder B has a radius of 2 m and a height of 4 m. What is the ratio of the volume of cylinder A to the volume of cylinder B? (1 point)
5:6
1:4
1:2
1:1

39. What is the volume of the oblique cone shown? Round the answer to the nearest tenth. The diagram is not drawn to scale. (1 point)
2,208.9 in³
1,472.6 in³
196.3 in³
4,417.9 in³

40. What is the surface area of a sphere with a circumference of 40 ft? Round the answer to the nearest tenth. (1 point)
6.4 ft²
509.3 ft²
254.6 ft²
40.5 ft²

41. The volume of a sphere is 2,098π m³. What is the surface area of the sphere to the nearest tenth? (1 point)
1,700 m²
146.2 m²
850 m²
26,364 m²

42. What is the scale factor of a cube with a volume of 343m³ to a cube with a volume of 5,832 m³? (1 point)
324:49
49:324
18:7
7:18

43. O is the center of the given circle. The measure of angle O is 128°. The diagram is not drawn to scale. Assuming that lines that appear to be tangent are tangent, what is the value of x? (1 point)
52
308
64
256

44. What is the value of x? Round the answer to the nearest tenth. The diagram is not drawn to scale. (1 point)
30
60
120
240

45. In the circle, mBC = 86°. The diagram is not drawn to scale. What is m∡BCP? (1 point) 43°
86°
90°
172°

46. In the figure, mDE = 124° and m BC= 36°. The diagram is not drawn to scale. What is m∡A? (1 point)
44°
62°
80°
88°

47. In the figure, m = 39° and m = 17°. The diagram is not drawn to scale. What is the value of x? (1 point)
56°
47.5°
28°
19.5°

48. What is the standard equation of the circle in the graph? (1 point)
(x+3)²+(y-2)²=9
(x-3)²+(y+2)²=9
(x-3)²+(y+2)²=3
(x+3)²+(y-2)²=3

49. What is the equation of the circle with the center that passes through the point? (1 point)
(x-2)²+(y+5)²=25
(x+2)²+(y-5)²=241
(x-2)²+(y+5)²=241
(x+2)²+(y-5)²=25

9 answers